0,3

Alfred S. Posamentier, Math Charmers, Tantalizing Tidbits for the Mind, Prometheus Books, NY, 2003, page 36.

a(0)-a(9)= a(n)^1, a(10)=81=9^2, a(11)=8^3, a(12)=7^4, a(13)=17^3, a(14)=18^3, a(15)=26^3,

a(16)=27^3, a(17)=22^4, a(18)=25^4, a(19)=28^4, a(20)=36^4, a(21)=28^5, a(22)=18^6,

a(23)=35^5, a(24)=36^5, a(25)=46^5, a(26)=18^7, a(27)=45^6, a(28)=27^7, a(29)=54^6,

a(30)=31^7, a(31)=34^7, a(32)=64^6, a(33)=43^7, a(34)=53^7, a(35)=58^7, ...,

fQ[n_] := Block[{b = Plus @@ IntegerDigits[n]}, If[b > 1, IntegerQ[ Log[b, n]] ]]; Take[ Select[ Union[ Flatten[ Table[n^m, {n, 55}, {m, 9}]]], fQ[ # ] &], 31] (from Robert G. Wilson v Jan 28 2005)

Sequence in context: A024662 A024663 A038178 this_sequence A135480 A032799 A024664

Adjacent sequences: A023103 A023104 A023105 this_sequence A023107 A023108 A023109

nonn,base,nice

David W. Wilson (davidwwilson(AT)comcast.net)